Remarks on Generalized Hardy Algebras

Abstract

For a measure space (, , μ) with a positive finite measure μ, and a positive real number p, we define the space Lp+(μ)=Lp+ of all (equivalence classes of) -measurable complex functions f defined on such that the function (+|f|)p is integrable with respect to μ .We define the metric dp on L+p which generalizes the metric introduced by Gamelin and Lumer in [G] for the case p=1. It is shown that the space L+p is a topological algebra. On the other hand, one can define on the space Lp+ an equivalent F-norm | ·|p that makes Lp+ into an Orlicz space. For the case of the normalized Lebesgue's measure dt/2π on [0,2π), it follows that the class Np(1<p<∞) introduced by I. I. Privalov in [P], may be considered as a generalization of the Smirnov class N+. Furthermore, Np(1<p<∞) with the associated modular becomes an Hardy-Orlicz class. Finally, for a strictly positive and measurable on [0,2π) function w, we define the generalized Orlicz space Lpw(dt/2π)=Lwp with the modular wp given by the function w(t,u)=((1+uw(t)))p, with a "weight" w. We observe that the space Lwp is a generalized Orlicz space with respect to the modular wp. We examine and compare different topologies induced on Lwp by corresponding "weights" w.